Normal Structure of the One-Point Stabilizer of a Doubly-Transitive Permutation Group. I
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Publication:4114003
DOI10.2307/1997094zbMath0345.20003OpenAlexW4249268665MaRDI QIDQ4114003
Publication date: 1975
Published in: Transactions of the American Mathematical Society (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.2307/1997094
Finite automorphism groups of algebraic, geometric, or combinatorial structures (20B25) Finite affine and projective planes (geometric aspects) (51E15) Multiply transitive finite groups (20B20) Characterization theorems for permutation groups (20B10)
Related Items (9)
Galois theory on the line in nonzero characteristic ⋮ Primitive permutation groups that contain a \(2^m\)-cycle ⋮ On projective planes of type (5,m) ⋮ On doubly transitive permutation groups ⋮ Doubly transitive permutation groups which are not doubly primitive ⋮ The classification of finite simple groups I. Simple groups and local analysis ⋮ Doubly transitive groups of odd degree whose one point stabilizers are local ⋮ On projective planes of type (6, m) ⋮ ‘On projective planes of type (6, m)’
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